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8. \( \sin (x-y)+\sin (x+y)=2 \sin x \cos y \)

Ask by Gough Reeves. in the United States
Mar 09,2025

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Answer

\[ \sin (x-y) + \sin (x+y) = 2 \sin x \cos y \]

Solution

We start with the left-hand side: \[ \sin (x-y)+\sin (x+y) \] Using the sum-to-product formula for sine functions, we have \[ \sin A + \sin B = 2 \sin \left(\frac{A+B}{2}\right) \cos \left(\frac{A-B}{2}\right) \] Let \[ A = x-y \quad \text{and} \quad B = x+y. \] Then, calculate \[ \frac{A+B}{2} = \frac{(x-y)+(x+y)}{2} = \frac{2x}{2} = x \] and \[ \frac{A-B}{2} = \frac{(x-y)-(x+y)}{2} = \frac{-2y}{2} = -y. \] Substituting these back into the sum-to-product formula, we obtain \[ \sin (x-y)+\sin (x+y) = 2 \sin x \cos(-y). \] Since cosine is an even function, we know that \[ \cos(-y)=\cos y. \] Thus, the right-hand side simplifies to \[ 2 \sin x \cos y. \] So, we have shown that \[ \sin (x-y)+\sin (x+y) = 2 \sin x \cos y, \] which completes the proof.

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The Deep Dive

Did you know that the equation \( \sin (x-y) + \sin (x+y) = 2 \sin x \cos y \) is derived from the sine addition and subtraction formulas? These formulas play a vital role in trigonometry, helping to express the sine of sums and differences of angles as products of sines and cosines, making complex calculations much easier! In real-world applications, these trigonometric identities are crucial in fields like physics, engineering, and even music theory! For instance, in physics, they help in analyzing wave patterns and oscillations. Understanding these relationships can simplify problems involving sound waves, electronic signals, and vibrations—turning math into a powerful tool for design and analysis!

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